delooping of a non-trivial finite group

notation: $BG$
objects: a single object
morphisms: the elements of a non-trivial finite group $G$
nLab Link
Related categories: $BG$ , $B\mathbb{N}$

Every group $G$ yields a groupoid $BG$ with a single object, morphisms given by the elements of $G$ , and composition given by the group operation. In this example, we consider the case of a non-trivial finite group $G$ (such as $G = C_2$ ).

Properties

Properties from the database

Deduced properties

Non-Properties

Non-Properties from the database

does not have zero morphisms

Deduced Non-Properties*

is not pointed
is not preadditive
is not additive
is not abelian
is not Grothendieck abelian
is not split abelian
is not trivial
is not essentially discrete
is not discrete
is not thin
does not have products
does not have finite products
does not have coequalizers
is not complete
is not finitely complete
does not have a terminal object
does not have countable products
does not have exact filtered colimits
is not infinitary distributive
is not distributive
is not locally presentable
is not locally finitely presentable
is not locally ℵ₁-presentable
is not finitary algebraic
is not an elementary topos
is not cartesian closed
is not a Grothendieck topos
does not have a subobject classifier
does not have equalizers
does not have binary products
does not have connected limits
does not have an initial object
does not have a strict initial object
is not Malcev
does not have coproducts
does not have disjoint coproducts
does not have finite coproducts
does not have disjoint finite coproducts
is not cocomplete
is not finitely cocomplete
does not have binary coproducts
does not have connected colimits
does not have a strict terminal object
does not have countable coproducts

*This also uses the deduced properties.

Unknown properties

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Special morphisms

Isomorphisms: every morphism
Monomorphisms: every morphism
Epimorphisms: every morphism